On Hamiltonicity of claw, net-free graphs

Abstract

An st-path is a path with the end-vertices s and t. An s-path is a path with an end-vertex s. The results of this paper include necessary and sufficient conditions for a claw, net-free graph G with given two different vertices s, t and an edge e to have (1)a Hamiltonian s-path, (2) a Hamiltonian st-path, (3) a Hamiltonian s- and st-paths containing edge e when G has connectivity one, and (4) a Hamiltonian cycle containing e when G is 2-connected. These results imply that a connected claw, net-free graph has a Hamiltonian path and a 2-connected claw, net-free graph has a Hamiltonian cycle [D. Duffus, R.J. Gould, M.S. Jacobson, Forbidden Subgraphs and the Hamiltonian Theme, in The Theory and Application of Graphs (Kalamazoo, Mich., 1980$), Wiley, New York (1981) 297--316.] Our proofs of (1)-(4) are shorter than the proofs of their corollaries in [D. Duffus, R.J. Gould, M.S. Jacobson] and provide polynomial-time algorithms for solving the corresponding Hamiltonicity problems. Keywords: graph, claw, net, claw, net-free graph, Hamiltonian path, Hamiltonian cycle, polynomial-time algorithm.

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